Title :
Convergence analysis and design of an adaptive filter with finite-bit power-of-two quantized error
Author_Institution :
Mil. Tech. Coll., Cairo, Egypt
fDate :
2/1/1992 12:00:00 AM
Abstract :
The analysis and design of an adaptive filter governed by an LMS algorithm with finite-bit power-of-two quantization of the error signal are discussed. Both the input data and the optimal filter weights are assumed stationary. An expression of the steady-state error power is derived. According to this expression, the error power is linearly increasing in the step size μ and exponentially decreasing in the number of quantizer bits B. A practically interesting result is derivation of a threshold value of B above which the error power is constant versus B. The threshold is a decreasing function of the noise power. Expressions of B and μ that achieve a given tolerable value of the error power with the fastest convergence and the minimum hardware complexity are provided
Keywords :
adaptive filters; convergence; errors; filtering and prediction theory; least squares approximations; LMS algorithm; adaptive filter; convergence; convergence analysis; finite-bit power-of-two quantized error; minimum hardware complexity; optimal filter weights; steady-state error power; Adaptive filters; Algorithm design and analysis; Convergence; Equations; Filtering algorithms; Gaussian noise; Hardware; Least squares approximation; Quantization; Signal processing algorithms;
Journal_Title :
Circuits and Systems II: Analog and Digital Signal Processing, IEEE Transactions on
